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2019年05月17日
【期刊论文】The sphere theorem for manifolds with positive scalar curvature
J. R. Gu, H. W. Xu
Journal of Differential Geometry,2012,92(3):507-545
2012年05月17日
We prove some new differentiable sphere theorems via the Ricci flow and stable currents. We extend the sphere theorems in Riemannian geometry to submanifolds in a Riemannian manifold. We give a classification of submanifolds with weakly pinched curvatures, which improves the differentiable pinching theorems due to Andrews, Baker, and the authors. We also show that the Yau conjecture is false.
Differentiable sphere theorem, Ricci flow, stable currents, the Yau conjecture
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2019年05月20日
【期刊论文】Geometric,topological and differentiable rigidity of submanifolds in space forms
H. W. Xu, J. R. Gu
Geom. Funct. Anal.,2013,23(1):1684-1703
2013年06月20日
In this paper, the authors investigate rigidity of geometric, topological and differentiable structures of compact submanifolds in a space form.
Submanifolds,, rigidity and sphere theorems,, Ricci curvature,, Ricci flow,, stable currents
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2019年05月20日
【期刊论文】Rigidity of Einstein manifolds with positive scalar curvature
H. W. Xu, J. R. Gu
Math. Ann.,2014,358(2):169-193
2014年06月20日
The purpose of this paper is to prove some new rigidity theorems for Einstein manifolds and submanifolds.
Einstein manifolds, rigidity theorems, positive scalar curvature
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2019年05月20日
【期刊论文】The second pinching theorem for hypersurfaces with constant mean curvature in a sphere
H. W. Xu, Z. Y. Xu
Math. Ann.,2013,356(2):869-883
2013年08月20日
We prove the second pinching theorem for hypersurfaces with constant mean curvature in a sphere.
Hypersurfaces with constant mean curvature, the second pinching theorem, , the second fundamental form, Chern', s conjecture
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2019年05月20日
【期刊论文】Geometric and differentiable rigidity of submanifolds in spheres
H. W. Xu, F. Huang, E. T. Zhao
J. Math. Pures Appl.,2013,99(1):330-342
2013年12月10日
In this paper, we investigate rigidity of geometric and differentiable structures of complete submanifolds via an extrinsic geometrical quantity τ(x) defined by the second fundamental form. We verify a geometric rigidity theorem for complete submanifolds with parallel mean curvature in a unit sphere. Inspired by the rigidity theorem, we prove a differentiable sphere theorem for complete submanifolds in a sphere . Moreover, we obtain a differentiable pinching theorem for complete submanifolds in a pinched Riemannian manifold.
Complete submanifolds, Geometric and differentiable structures, Rigidity, theorem, Ricci flow, Stable currents
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